SAT Systems of Two Linear Equations Question 11 | Free SAT Prep | Aniko

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Question 11·Medium·Systems of Two Linear Equations in Two Variables

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A recreation center sells day passes for adults and for seniors. An adult day pass costs $15, and a senior day pass costs $10. On a certain day, the center sold a total of 40 day passes for $530. How many of the passes sold that day were senior passes?

For word problems about tickets or passes with different prices, immediately turn the words into a system of equations: one equation for the total number of items, and another for the total cost. Clearly define your variables, write both equations, then use elimination (often faster than substitution here) to solve. Finally, match your solution back to what the question is actually asking (adult vs. senior, etc.) and quickly check by plugging the values into both original equations to avoid mix-ups or arithmetic errors.

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Choose variables

Let $a$ be the number of adult passes and $s$ be the number of senior passes. How can you write an equation that uses $a$ and $s$ to represent the total number of passes (40)?

Use the total money information

Each adult pass is $15 and each senior pass is $10. How can you write an equation involving $a$ and $s$ that equals the total money collected, 530?

Solve the system efficiently

Once you have the two equations, decide whether substitution or elimination will be faster. Can you multiply one equation so that adding or subtracting the equations cancels one variable?

Check your solution

After solving, plug your values for $a$ and $s$ back into both equations to make sure they satisfy both the total number of passes and the total money collected.

Desmos Guide

Enter the equation for total passes

In Desmos, use $x$ for adult passes and $y$ for senior passes. Type the equation x + y = 40.

Enter the equation for total money

Type the second equation 15x + 10y = 530. You should now see two lines on the graph.

Find the intersection point

Tap or click on the point where the two lines intersect. The coordinates will appear as $(x, y)$ . The $y$ -value of this point is the number of senior passes sold.

Step-by-step Explanation

Define variables and write the equations

Let $a$ be the number of adult passes and $s$ be the number of senior passes.

From the problem:

Total passes: $a + s = 40$
Total money: $15a + 10s = 530$

So we have a system of two equations in two variables.

Use elimination to remove one variable

We want to eliminate either $a$ or $s$ . Eliminate $s$ by making the $s$ terms cancel.

Multiply the first equation by $-10$ :

-10(a + s) = -10(40) \\[0.7em] -10a - 10s = -400

Now add this to the second equation:

(15a + 10s) + (-10a - 10s) = 530 + (-400)

which simplifies to

5a = 130

Solve for the number of adult passes

From $5a = 130$ , divide both sides by $5$ :

a = \frac{130}{5} = 26

So there were $26$ adult passes sold.

Find the number of senior passes and answer the question

Use $a + s = 40$ and $a = 26$ :

26 + s = 40

Subtract $26$ from both sides:

s = 40 - 26 = 14

So the number of senior passes sold was 14.

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Desmos Guide

Step-by-step Explanation

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Strategy

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Desmos Guide

Step-by-step Explanation